Forces due to atmospheric pressure won't cancel in an open tank

AI Thread Summary
The discussion centers on the misunderstanding of hydrostatic force in open tanks and how atmospheric pressure affects it. Participants clarify that the hydrostatic force on the bottom of a tank is determined by the weight of the liquid alone, not influenced by atmospheric pressure, which cancels out in the calculations. The ambiguity arises from how "force caused by liquid" is defined, leading to confusion between direct force and the weight of the liquid. The conversation emphasizes the need for clear definitions in scientific literature to avoid misinterpretations. Ultimately, the consensus is that the hydrostatic force is the gauge pressure times the area, independent of atmospheric pressure.
Miguel Velasquez
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Homework Statement


[/B]
I am trying to understand why books always point as a fact that hydrostatic force on the bottom of a open liquid filled tank doesn't depend on the force due atmospheric pressure because they these forces cancels each other.

Homework Equations


[/B]
P=[P][/o]+ρgh

F=P*A

Third/Second's Newton Law.

The Attempt at a Solution



Please indicate in which step i went wrong instead just pointing the same argument that books provides without formulas/eqs. Like, "Your application of the Newton's second law is wrong, or your substitution from eq. (1) into (2) is wrong". Thanks very much in advance.

http://docdro.id/SYbWm95[/B]
 
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Miguel Velasquez said:
Please indicate in which step i went wrong ...
You don't show any steps, just two equations both of which are correct and the names of two Laws. Steps would be what you make of all these. So I will present you with a picture and ask you a question.

Suppose you are at sea level and put a glass (tank) filled with water on a scale and it reads 10 N. Then you climb to the top of a 2 km high mountain where the atmospheric pressure is lower. What do you think the scale will read? Neglect the buoyant force of the air.
 
I don't see where your analysis in conflict with the statement. The net force on the bottom of the tank from the liquid pressure above and the air pressure below is just equal to the weight of the fluid in the tank: $$F_{liq}-F(atm\ below)=mg$$
 
kuruman said:
You don't show any steps, just two equations both of which are correct and the names of two Laws. Steps would be what you make of all these. So I will present you with a picture and ask you a question.

Suppose you are at sea level and put a glass (tank) filled with water on a scale and it reads 10 N. Then you climb to the top of a 2 km high mountain where the atmospheric pressure is lower. What do you think the scale will read? Neglect the buoyant force of the air.

Sorry maybe i have should pointing from the beginning my attempt to solve the problem was in the pdf file, i repost the link http://docdro.id/SYbWm95
 
Chestermiller said:
I don't see where your analysis in conflict with the statement. The net force on the bottom of the tank from the liquid pressure above and the air pressure below is just equal to the weight of the fluid in the tank: $$F_{liq}-F(atm\ below)=mg$$

I must be doing something wrong because books point the F_liq=MassLiquid*g. See by example "Serway - Physics for Scientists, 7th Ed, page 409, exercise 11."

"11. A swimming pool has dimensions 30.0 m 10.0 m and a
flat bottom. When the pool is filled to a depth of 2.00 m
with fresh water, what is the force caused by the water on
the bottom? On each end? On each side?"

The answer on the bottom is F_liq=M*g=ρVg=5.88x10^6 N ≠ My result = mg+F_atm
 
Miguel Velasquez said:
I must be doing something wrong because books point the F_liq=MassLiquid*g. See by example "Serway - Physics for Scientists, 7th Ed, page 409, exercise 11."

"11. A swimming pool has dimensions 30.0 m 10.0 m and a
flat bottom. When the pool is filled to a depth of 2.00 m
with fresh water, what is the force caused by the water on
the bottom? On each end? On each side?"

The answer on the bottom is F_liq=M*g=ρVg=5.88x10^6 N ≠ My result = mg+F_atm
Well, your answer is more correct than the book.
 
Chestermiller said:
Well, your answer is more correct than the book.

I got that feeling too, i have been checking this result for weeks, with few sleep and can't find any mistake in my reasoning. Can anyone else confirm if this result is correct/wrong please?
 
You don't need anyone else to confirm this. I have lots of experience in fluid mechanics. This same kind of deal comes into play when doing macroscopic momentum balances on fluid flow in ducts of varying cross section, in determining the additional force exerted on the duct wall when the fluid is flowing. See this thread: https://www.physicsforums.com/threads/nozzle-conservation-of-momentum.901349/
 
Last edited:
I think that Serway is correct if by "hydrostatic force" is meant force exerted by a fluid other than air. In other words the hydrostatic force is "gauge pressure times area". Take an empty container standing on a table. Pump some air in it to pressurize the container to 2p0. What is the total force at the bottom of the container? Answer: 2p0A (neglecting the weight of the air). Is that the hydrostatic force? No, because air does not count as something that exerts a hydrostatic force. Note that 2p0A is the force due to gauge pressure; we did not subtract p0A which is the force exerted on the outside of the bottom by atmospheric pressure.

Now put fluid of density ρ to height h in the container and vent some of the air so that the pressure above the surface is maintained at 2p0. What is the total force now? Answer: 2p0 + ρghA. OK, but what is the hydrostatic force on the bottom? Answer: ρghA, the increase to the existing force due to the addition of the fluid. That difference is, quite simply, the weight of the fluid.
 
  • #10
kuruman said:
I think that Serway is correct if by "hydrostatic force" is meant force exerted by a fluid other than air. In other words the hydrostatic force is "gauge pressure times area". Take an empty container standing on a table. Pump some air in it to pressurize the container to 2p0. What is the total force at the bottom of the container? Answer: 2p0A (neglecting the weight of the air). Is that the hydrostatic force? No, because air does not count as something that exerts a hydrostatic force. Note that 2p0A is the force due to gauge pressure; we did not subtract p0A which is the force exerted on the outside of the bottom by atmospheric pressure.

Now put fluid of density ρ to height h in the container and vent some of the air so that the pressure above the surface is maintained at 2p0. What is the total force now? Answer: 2p0 + ρghA. OK, but what is the hydrostatic force on the bottom? Answer: ρghA, the increase to the existing force due to the addition of the fluid. That difference is, quite simply, the weight of the fluid.
I think the OP understands all this.
 
  • #11
Thanks to both for your response, sorry for late reply, there was a blackout earlier. Ill try to read carefully both answers to see if i can clarify my doubt.
 
  • #12
Miguel Velasquez said:
the force caused by the water
The trouble is that "caused by" is ambiguous. It could mean the direct force the water applies to the surface, as you have interpreted it, but it could equally be interpreted as meaning the difference made by the presence of the water. Indeed, the second seems more reasonable to me.
 
  • #13
haruspex said:
The trouble is that "caused by" is ambiguous. It could mean the direct force the water applies to the surface, as you have interpreted it, but it could equally be interpreted as meaning the difference made by the presence of the water. Indeed, the second seems more reasonable to me.
Yes. One has to be very careful to understand specifically what the literature author intends to be saying in these contexts.

I would add that I prefer the way Miguel analyzes this because there is less chance for error in solving actual problems. Of course, once he gets comfortable with it, he can switch to working in terms of gauge pressures and forces (for incompressible fluids).
 
  • #14
I agree with you, I am tired to check over and over my result, it doesn't seems to be nothing wrong with it, nothing wrong with math or reasoning, its a problem about definition. How do books define "Force exerted by a liquid in open liquid filled tank" is the question to answer. If we define the force caused by liquid as direct force that liquid exerts on the bottom surface, then


[F][/liq]≡[F][/DirectOnSurflByLiq]=mg+[F][/atm]

and if we define the force caused by liquid as the weight of liquid, then

[F][/liq]≡[F][/DirectOnSurflByLiq]-[F][/atm]=mgI wish authors in books define concepts in a very clearly way, there should not be space for ambiguity in science. If anyone has anything else to add to this post, i would like to conclude it.

Thank you very much to Chestermiller, kuruman and haruspex for your time and your sharp comments. I appreciate it.
 

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